Existence results for hybrid integral boundary value problems of nonlinear Langevin equation with two different fractional orders
In this paper, a new type of Langevin equation with two different fractional orders is considered. By using Leray-Schauder”s fixed point theorem and Banach”s fixed point theorem, we obtain the existence and uniqueness results of the solution.Fractional-order models are found to be more accurate than integer-order models, that is, there are more degrees of freedom in the fractional-order models. Fractional differential equations arise in many engineering and scientific disciplines as the mathematical modeling of systems and processes in the fields of prisics, chemistry, aero dynamics,electro dynamics of complex medium,polymer rheology, etc. involves derivatives of fractional order.Fractional differential equations also serve as an excellent tool for the description of hereditary properties of various materials and processes. In consequence, the subject of fractional differential equations is gaining much importance and attention. For details. see f3-221 and the references therein.<br> <br>
非线性分步朗之万方程 积分边界条件 不动点定理
Guotao Wang Lihong Zhang
School of Mathematics and Computer Science, Shanxi Normal University, Linfen, Shanxi 041004, P. R. China
国内会议
太原
英文
1-10
2011-07-01(万方平台首次上网日期,不代表论文的发表时间)